Quantitative Steinitz Theorem: A polynomial bound

Abstract

The classical Steinitz theorem states that if the origin belongs to the interior of the convex hull of a set S ⊂ Rd, then there are at most 2d points of S whose convex hull contains the origin in the interior. B\'ar\'any, Katchalski, and Pach proved the following quantitative version of Steinitz's theorem. Let Q be a convex polytope in Rd containing the standard Euclidean unit ball Bd. Then there exist at most 2d vertices of Q whose convex hull Q satisfies \[ r Bd ⊂ Q \] with r≥ d-2d. They conjectured that r≥ c d-1/2 holds with a universal constant c>0. We prove r ≥ 15d2, the first polynomial lower bound on r. Furthermore, we show that r is not be greater than 2d.

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